User:Drypuglia

Well over "retirement age"-I persist in my profession as an analytical; Consulting Engineer, dealing with problems in the field of mechanics. I earned my degree from the University of Connecticut and have taken post graduate engineering courses at that institution. During the summer following my 3d year in collage I solved a metals problem for the Fuller Brush Co. After graduation I worked for Winchester Co. as head of their Research Dpt.Involved in both Winchester and Government projects.I then worked for Farrel Co. a group leader in the R&D department.At Farrel I then became manager of the Rolls and Calenders for the paper Industry. As a member of TAPPI I wrote and presented a number of papers based solely on my original work.I have several patents in both fields. Science and problems still interest me.For example, with little information, during the great oil spill when they asked for help-I calculated the rate of oil spill. In the field of Metrology -(the measuring of cylinders and calender roll surfaces and important to the paper industry)- I used Fourier equations in a 14x14 Matrix. The results proved superior to the standard Fourier transform.A paper on this subject is available- along with my original theses on Trisecting- on Web site www.fmt-equipment.com

I have used and visited Wikipedia for many years-Lately, Trisecting an angle and the Riemann Hypothesis. Two years ago I wrote a book-published by Amazon- titled: Trisecting Angles and Other Solutions. This followed my appearance on YouTube - Trisecting an Angle and Squaring the Circle!Drypuglia (talk) 22:56, 19 January 2023 (UTC)

The Trisection Solution: The stepwise procedure illustrated in step 1 shows first quadrant of an arbitrary base circle and a trisected angle. The angle is constructed by drawing an unknown angle divide it then adding 1/2 of that angle to form a trisected angle- or by simply marking off three equal spaces along the circumference of the base circle-using a compass. If we now draw lines from the circle center to these points we have a trisected angle to work with! Both of these methods are used in solving all of the ancient puzzles. Now by drawing a horizontal line between the second and third lines so that they intersect and we have an intersecting point that is Singularly characteristic of this trisected angle. As shown in fig.2, repeating this procedure at angular intervals- up to 90 deg. eventually, we have a series of intersecting points. Connecting these points as shown in fig. 3, results in a 90 deg., arc-like curve within the base circle. We now have constructed a TRISECTION CURVE: the Solution to the Ancient puzzle! Fig.4 shows how this curve is used to trisect two arbitrary angles with excellent results. Note that these points are at exactly 2/3 of the unknown angle. Dividing the remaining portions of these angles and we complete the trisection of both angles. This curve is indeed the “Magic Circle” Trisectors have been searching for. Later we will show that this procedure can be used to 5- sect angles, as it can for higher prime divisional sections.Drypuglia (talk) 20:59, 21 January 2023 (UTC)